Description
This talk will introduce the concept of almost-additive functions on lattices with the special case of eigenvalue-counting functions of random Schrödinger operators and showcase how they can be used in conjunction with some results from empirical process theory to find explicit error estimates for their convergence to the integrated density of states. This talk is based on joint work with Christoph Schumacher, Fabian Schwarzenberger and Ivan Veselić.
Primary author
Co-authors
Prof.
Ivan Veselic
(TU Dortmund)
Prof.
Fabian Schwarzenberger
(HTW Dresden)
Dr
Christoph Schumacher
(TU Dortmund)